阶梯轴圆角大小确定
如题,在阶梯轴的设计中,过渡圆角应该如何确定?因为现阶段设计的都是低载低转速的,因此过渡圆角基本都是大概给一个,也没有认真核算(其实是不知道怎么核算)。所以想请教一下大家,这个过渡圆角该如何确定?是否应该遵循什么原则? 和套子倒角的大小要配合上就行吧,至于具体尺寸我们公司的设计也没有什么计算公式 就一个原则:在满足使用功能的前提下,圆角越大越好 支持三楼的设计原则。 圆角主要是为了在轴的截面突变处减小应力集中。可以查机械设计手册或者机械工艺手册。
这个帖子和你问的问题是同一问题,参考下。
阶梯轴过渡圆角大小
http://www.cmiw.cn/thread-474783-1-1.html
(出处: 机械社区)
看看把,希望能帮到你
data:image/png;base64,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
这个应该可以参考一下
页:
[1]